If the current debt is 2 trillion dollars, then the GDP must be 2/1.15=$1.7391 X 10^12. If the ratio of 15% must be maintained in 5 years time, then the GDP must grow to: 3/2 X 1.7391 X 10^12
=$2.60865 X 10^12. Because: 3 X 10^12/2.60865 X 10^12=1.15=15%
Answer:
Hence, the new country's GDP have to be 20 trillion dollars in order to maintain the current debt to gdp-ratio.
Step-by-step explanation:
if a country's debt-to-gdp ratio is currently 15%.
If the current debt(d) is 2 trillion dollars, then the initial GDP(g) must be
[tex]\dfrac{d}{g}=15\%=0.15[/tex]
Here d=2
Hence [tex]g=\dfrac{2}{0.15}=13.33[/tex]
Hence, the current GDP or initial GDP is 13.33 trillion dollar.
Now after 5 years the debt is expected to be 3 trillion dollars i.e. d'=3 trillion dollars.
Let the new GDP be denoted by g'
Hence,
[tex]\dfrac{d'-d}{g'-g}=0.15\\ \\\dfrac{3-2}{g'-13.33}=0.15\\\\\dfrac{1}{g'-13.33}=0.15\\\\\dfrac{1}{0.15}=g'-13.33\\\\g'=20[/tex]
Hence, the new country's GDP have to be 20 trillion dollars in order to maintain the current debt to gdp-ratio.
